This statement is used without explanation in the proof of a Corollary to Proposition 4.3.5, pages 210-211 of the book "Algèbre et théories galoisiennes" by R. and A. Douady, second edition, Cassini, Paris, 2005.
It is well known that the claim is true if the base of the covering space is connected and locally connected. Any ideas for a proof without assuming the base to be locally connected?
EDIT: The definition of covering space in that book is just a fiber bundle with discrete fibers.
It seems that a solenoid yields a counterexample. A solenoid can be written as the quotient space of the product $[0,1]\times \{0,1\}^\omega$ by a map that identifies each point $(0,x)$ with the point $(1,f(x))$ where $f:\{0,1\}^\omega\to\{0,1\}^\omega$ is a homeomorphism that has a dense orbit (this property of $f$ ensures that the solenoid is connected). It is easy to see that the solenoid can be covered by the space $\mathbb R\times\{0,1\}^\omega$ and the image of each connected component (which is homeomorphic to $\mathbb R$) under the covering map is of the first Baire category in the base.
